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Suppose that f is an even function, g is odd, both are integrable on [-7, 7], and we know that….

Suppose that f is an even function, g is odd, both are integrable on [-7, 7], and-example-1
User Czarek
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1 Answer

15 votes
15 votes

SOLUTION:

Step 1:

In this question, we have given the following:

Step 2:

The details of the solution are as follows:

Suppose that f is an even function, g is odd, both are integrable on [-7, 7], and we know that:


\begin{gathered} \int ^7_0f(x)dx\text{ = 5, Recall that f(x) is an even function} \\ \text{Then} \\ \int ^7_(-7)f(x)dx\text{ = 2 ( 5 ) = 10} \end{gathered}
\begin{gathered} \int ^7_0g(x)dx\text{ = 4. 5 , Recall that g(x) is an odd function} \\ \text{Then } \\ \int ^7_(-7)g(x)dx\text{ =4. 5 - 4. 5 }=\text{ 0} \end{gathered}

Finally, we can see that:


\int ^7_(-7)\lbrack\text{ f(x) + g ( x) }\rbrack dx\text{ = 10 + 0 = 10}

Suppose that f is an even function, g is odd, both are integrable on [-7, 7], and-example-1
User Akceptor
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3.1k points
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